Title :
Tracking Stopping Times Through Noisy Observations
Author :
Niesen, Urs ; Tchamkerten, Aslan
Author_Institution :
Dept. of Electr. Eng. & Comput. Sci., Massachusetts Inst. of Technol., Cambridge, MA
Abstract :
A novel quickest detection setting is proposed, generalizing the well-known Bayesian change-point detection model. Suppose {(Xi,Yi)}i ges 1 is a sequence of pairs of random variables, and that S is a stopping time with respect to {Xi}i ges 1. The problem is to find a stopping time T with respect to {Yi}i ges 1 that optimally tracks S, in the sense that T minimizes the expected reaction delay BBE (T-S)+, while keeping the false-alarm probability P(T<S) E(T-S) below a given threshold alpha isin [0,1]. This problem formulation applies in several areas, such as in communication, detection, forecasting, and quality control.
Keywords :
Bayes methods; polynomials; random processes; trees (mathematics); Bayesian change-point detection; elementary methods; false-alarm probability; noisy observations; positive integer; random variables; reaction delay; stopping times tracking; tree structure; Algorithm design and analysis; Bayesian methods; Decision theory; Delay effects; Feedback communications; Polynomials; Quality control; Random variables; Transmitters; Tree data structures; Algorithms; decision theory; feedback communication; forecasting; monitoring; optimal stopping; quickest detection problem; sequential analysis; synchronization; tree analysis;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2008.2008115
